Advertisements
Advertisements
प्रश्न
The first term of an AP is –5 and the last term is 45. If the sum of the terms of the AP is 120, then find the number of terms and the common difference.
उत्तर
Let the first term, common difference and the number of terms of an AP are a, d and n respectively.
Given that, first term (a) = −5 and
Last term (l) = 45
Sum of the terms of the AP = 120
⇒ Sn = 120
We know that, if last term of an AP is known, then sum of n terms of an AP is,
Sn = `n/2 (a + 1)`
⇒ 120 = `n/2(-5 + 45)`
⇒ 120 × 2 = 40 × n
⇒ n = 3 × 2
⇒ n = 6
∴ Number of terms of an AP is known, then the nth term of an AP is,
l = a + (n – 1)d
⇒ 45 = –5 + (6 – 1)d
⇒ 50 = 5d
⇒ d = 10
So, the common difference is 10.
Hence, number of terms and the common difference of an AP are 6 and 10 respectively.
APPEARS IN
संबंधित प्रश्न
In an AP given a3 = 15, S10 = 125, find d and a10.
Find the sum of all 3-digit natural numbers, which are multiples of 11.
Divide 24 in three parts such that they are in AP and their product is 440.
If ` 4/5 ` , a , 2 are in AP, find the value of a.
Choose the correct alternative answer for the following question .
If for any A.P. d = 5 then t18 – t13 = ....
The A.P. in which 4th term is –15 and 9th term is –30. Find the sum of the first 10 numbers.
If the 10th term of an A.P. is 21 and the sum of its first 10 terms is 120, find its nth term.
If the sum of first n terms of an A.P. is \[\frac{1}{2}\] (3n2 + 7n), then find its nth term. Hence write its 20th term.
Q.11
For an A.P., If t1 = 1 and tn = 149 then find Sn.
Activitry :- Here t1= 1, tn = 149, Sn = ?
Sn = `"n"/2 (square + square)`
= `"n"/2 xx square`
= `square` n, where n = 75
